14 + 14 = 28...................28 is the 2nd perfect number............1.41421..................14 i and 21i................are the locations of the 1st 2 zeros...............................both 14 and 21 are in the 1st 6 numbers of the square root of 2.........
History[edit]
Babylonian clay tablet
YBC 7289 with annotations. Besides showing the square root of 2 in
sexagesimal (
1 24 51 10), the tablet also gives an example where one side of the square is 30 and the diagonal then is
42 25 35. The sexagesimal digit 30 can also stand for
0 30 =
1/2, in which case
0 42 25 35 is approximately 0.7071065.
The
Babylonian clay tablet
YBC 7289 (c. 1800–1600 BC) gives an approximation of
√2 in four
sexagesimal figures,
1 24 51 10, which is accurate to about six
decimal digits,
[1] and is the closest possible three-place sexagesimal representation of
√2:
Another early close approximation is given in
ancient Indian mathematical texts, the
Sulbasutras (c. 800–200 BC) as follows:
Increase the length [of the side] by its third and this third by its own fourth less the thirty-fourth part of that fourth.[2] That is,
This approximation is the seventh in a sequence of increasingly accurate approximations based on the sequence of
Pell numbers, that can be derived from the
continued fraction expansion of
√2. Despite having a smaller denominator, it is only slightly less accurate than the Babylonian approximation.
Pythagoreans discovered that the diagonal of a square is incommensurable with its side, or in modern language, that the square root of two is
irrational. Little is known with certainty about the time or circumstances of this discovery, but the name of
Hippasus of Metapontum is often mentioned. For a while, the Pythagoreans treated as an official secret the discovery that the square root of two is irrational, and, according to legend, Hippasus was murdered for divulging it.
[3][4][5] The square root of two is occasionally called "Pythagoras' number" or "Pythagoras' constant", for example by
Conway & Guy (1996).
[6]
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